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Hauptverfasser: Teutsch, Johannes, Molodchyk, Oleksii, Leibold, Marion, Faulwasser, Timm, Lederer, Armin
Format: Preprint
Veröffentlicht: 2026
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2605.09757
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author Teutsch, Johannes
Molodchyk, Oleksii
Leibold, Marion
Faulwasser, Timm
Lederer, Armin
author_facet Teutsch, Johannes
Molodchyk, Oleksii
Leibold, Marion
Faulwasser, Timm
Lederer, Armin
contents Providing non-conservative uncertainty quantification for function estimates derived from noisy observations remains a fundamental challenge in statistical machine learning, particularly for applications in safety-critical domains. In this work, we propose novel non-asymptotic probabilistic uniform error bounds for kernel-based regression. Compared to related bounds in the literature that are restricted to (conditionally) independent sub-Gaussian noise, our bounds allow to consider a broad class of non-Gaussian distributions, such as sub-Gaussian, bounded, sub-exponential, and variance/moment-bounded noise. Moreover, our results apply to correlated and uncorrelated noise. We compare our proposed error bounds with existing results in terms of the induced uncertainty region and their performance in safe control, demonstrating the tightness of the proposed bounds.
format Preprint
id arxiv_https___arxiv_org_abs_2605_09757
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On Uniform Error Bounds for Kernel Regression under Non-Gaussian Noise
Teutsch, Johannes
Molodchyk, Oleksii
Leibold, Marion
Faulwasser, Timm
Lederer, Armin
Machine Learning
Providing non-conservative uncertainty quantification for function estimates derived from noisy observations remains a fundamental challenge in statistical machine learning, particularly for applications in safety-critical domains. In this work, we propose novel non-asymptotic probabilistic uniform error bounds for kernel-based regression. Compared to related bounds in the literature that are restricted to (conditionally) independent sub-Gaussian noise, our bounds allow to consider a broad class of non-Gaussian distributions, such as sub-Gaussian, bounded, sub-exponential, and variance/moment-bounded noise. Moreover, our results apply to correlated and uncorrelated noise. We compare our proposed error bounds with existing results in terms of the induced uncertainty region and their performance in safe control, demonstrating the tightness of the proposed bounds.
title On Uniform Error Bounds for Kernel Regression under Non-Gaussian Noise
topic Machine Learning
url https://arxiv.org/abs/2605.09757